This work introduces a general framework for constructing high-order, linearly stable, partitioned solvers for multiphysics problems from a monolithic implicit–explicit Runge–Kutta (IMEX-RK) discretization of the semi-discrete equations. The generic multiphysics problem is modeled as a system of n systems of partial differential equations where the ith subsystem is coupled to the other subsystems through a coupling term that can depend on the state of all the other subsystems. This coupled system of partial differential equations reduces to a coupled system of ordinary differential equations via the method of lines where an appropriate spatial discretization is applied to each subsystem. The coupled system of ordinary differential equations...
As the use of computer simulation for scientific discovery increases there is a growing need for rel...
AbstractThe main difficulty in the implementation of most standard implicit Runge–Kutta (IRK) method...
A new implicit method has been developed for solving the viscous full multi-fluid equations, which i...
This work introduces a general framework for constructing high-order, linearly stable, partitioned s...
In the numerical solution of partial differential equations using a method-of-lines approach, the av...
Thermal interaction of fluids and solids, or conjugate heat transfer (CHT), is en-countered in many ...
Coupled problems consist of two or more problems which in most cases describe different physical ph...
Most research on preconditioners for time-dependent PDEs has focused on implicit multi-step or diago...
Implicit–explicit (IMEX) time stepping methods can efficiently solve differential equations with bot...
Many practical problems in science and engineering are modeled by large systems of ordinary differen...
Thermal interaction of fluids and solids, or conjugate heat transfer (CHT), is encountered in many e...
The application of partitioned schemes to fluid–structure interaction (FSI) allows the use of already...
The largest runs up-to-now are usually performed for simple symmetric positive definite systems. It ...
The design of a modular multi-physics high-order space-time finite-element framework is presented to...
This paper deals with the numerical solution of systems of differential equations with a stiff part ...
As the use of computer simulation for scientific discovery increases there is a growing need for rel...
AbstractThe main difficulty in the implementation of most standard implicit Runge–Kutta (IRK) method...
A new implicit method has been developed for solving the viscous full multi-fluid equations, which i...
This work introduces a general framework for constructing high-order, linearly stable, partitioned s...
In the numerical solution of partial differential equations using a method-of-lines approach, the av...
Thermal interaction of fluids and solids, or conjugate heat transfer (CHT), is en-countered in many ...
Coupled problems consist of two or more problems which in most cases describe different physical ph...
Most research on preconditioners for time-dependent PDEs has focused on implicit multi-step or diago...
Implicit–explicit (IMEX) time stepping methods can efficiently solve differential equations with bot...
Many practical problems in science and engineering are modeled by large systems of ordinary differen...
Thermal interaction of fluids and solids, or conjugate heat transfer (CHT), is encountered in many e...
The application of partitioned schemes to fluid–structure interaction (FSI) allows the use of already...
The largest runs up-to-now are usually performed for simple symmetric positive definite systems. It ...
The design of a modular multi-physics high-order space-time finite-element framework is presented to...
This paper deals with the numerical solution of systems of differential equations with a stiff part ...
As the use of computer simulation for scientific discovery increases there is a growing need for rel...
AbstractThe main difficulty in the implementation of most standard implicit Runge–Kutta (IRK) method...
A new implicit method has been developed for solving the viscous full multi-fluid equations, which i...